Find the vectors T and N and the binormal vector B = T ⨯ N, for...

Given r(t)=sin(t)i+cos(t)j−ln(cos(t))k, find the unit normal vector N(t) evaluated at t=0,N(0).

Given r(t)=sin(t)i+cos(t)j−ln(cos(t))k, find the unit normal vector N(t) evaluated at t=0,N(0).

Given r(t)=eti+e-tj+tk, find the binormal vector B(0).

Given r(t)=eti+e-tj+tk, find the binormal vector B(0).

Evaluate (if possible) the vector-valued function at each given value of t. (If you need to...

Evaluate (if possible) the vector-valued function at each given value of t. (If you need to use Δt, enter Deltat.) r(t) = 1/2t2i − (t − 9)j Evaluate (if possible) the vector-valued function at each given value of t. (If an answer does not exist, enter DNE.) r(t) = cos(t)i + 9 sin(t)j

Find the velocity, acceleration, and speed of a particle with the given position function. (a) r(t)...

Find the velocity, acceleration, and speed of a particle with the given position function. (a) r(t) = e^t cos(t)i+e^t sin(t)j+ te^tk, t = 0 (b) r(t) = 〈t^5 ,sin(t)+ t ^ cos(t),cos(t)+ t^2 sin(t)〉, t = 1

Find a unit tangent vector to the curve r = 3 cos 3t i + 3...

Find a unit tangent vector to the curve r = 3 cos 3t i + 3 sin 2t j at t = π/6 .

Consider the following vector function. r(t) = 6t2, sin(t) − t cos(t), cos(t) + t sin(t)...

Consider the following vector function. r(t) = 6t2, sin(t) − t cos(t), cos(t) + t sin(t) ,    t > 0 (a) Find the unit tangent and unit normal vectors T(t) and N(t). T(t) = N(t) = (b) Use this formula to find the curvature. κ(t) =

1) For vectors a and b find the projection of a on b. a =< 4,...

1) For vectors a and b find the projection of a on b. a =< 4, −3 >,b =< 3, 2 > 2) Find the area of the parallelogram with adjacent sides a = i + j and b = i + k 3) Find the unit tangent T for the following curve r =< 2 cos t^2 , 2 sin t^2 >

Find the unit tangent vector T and the principle unit normal vector N of ⃗r(t) =...

Find the unit tangent vector T and the principle unit normal vector N of ⃗r(t) = cos t⃗i + sin t⃗j + ln(cos t)⃗k at t = π .

Given r(t) = (et cos(t) )i + (et sin(t) )j + 2k. Find (i) unit tangent...

Given r(t) = (et cos(t) )i + (et sin(t) )j + 2k. Find (i) unit tangent vector T. (ii) principal unit normal vector N.

Find the derivative r '(t) of the vector function r(t). <t cos 3t , t2, t...

Find the derivative r '(t) of the vector function r(t). <t cos 3t , t2, t sin 3t>